Nested Closed Paths in Two-Dimensional Percolation

Abstract

For two-dimensional percolation on a domain with the topology of a disc, we introduce a nested-path operator (NP) and thus a continuous family of one-point functions Wk R · k , where is the number of independent nested closed paths surrounding the center, k is a path fugacity, and R projects on configurations having a cluster connecting the center to the boundary. At criticality, we observe a power-law scaling Wk LX NP, with L the linear system size, and we determine the exponent X NP as a function of k. On the basis of our numerical results, we conjecture an analytical formula, X NP (k) = 34φ2 -548φ2/ (φ2-23) where k = 2 (π φ), which reproduces the exact results for k=0,1 and agrees with the high-precision estimate of X NP for other k values. In addition, we observe that W2(L)=1 for site percolation on the triangular lattice with any size L, and we prove this identity for all self-matching lattices.